Pade interpolation by F-polynomials and transfinite diameter
Abstract
We define -polynomials as linear combinations of dilations by some frequencies of an entire function . In this paper we use Pade interpolation of holomorphic functions in the unit disk by -polynomials to obtain explicitly approximating -polynomials with sharp estimates on their coefficients. We show that when frequencies lie in a compact set then optimal choices for the frequencies of interpolating polynomials are similar to Fekete points. Moreover, the minimal norms of the interpolating operators form a sequence whose rate of growth is determined by the transfinite diameter of . In case of the Laplace transforms of measures on , we show that the coefficients of interpolating polynomials stay bounded provided that the frequencies are Fekete points. Finally, we give a sufficient condition for measures on the unit circle which ensures that the sums of the absolute values of the coefficients of interpolating polynomials stay bounded.
Keywords
Cite
@article{arxiv.1105.0660,
title = {Pade interpolation by F-polynomials and transfinite diameter},
author = {Dan Coman and Evgeny A. Poletsky},
journal= {arXiv preprint arXiv:1105.0660},
year = {2011}
}
Comments
16 pages